Uniform Approximation and Fine Potential Theory

We say a real number : is uniformly approximable if the upper bound in Dirichlet's theorem, from diophantine approximation, of 1Â(Q+1) q may be sharpened to c(:)Â(Q+1) 2 for all sufficiently large Q. Here we begin by showing that the set of uniformly approximable numbers is precisely the set of badl

We discuss and examine Weierstrass' main contributions to approximation theory. 2000 Academic Press 1. WEIERSTRASS This is a story about Karl Wilhelm Theodor Weierstrass (Weierstra? ), what he contributed to approximation theory (and why), and some of the consequences thereof. We start this story b

The method of variational matrix Pade approximants is seen to unify the Green's function method and the variational principle for calculating scattering amplitudes. The surprising result that exact answers can be obtained for square well potentials is thereby proved, and the remarkable accuracy of t

The role of the exchange-correlation potential and the exchange-correlation kernel in the calculation of excitation energies from time-dependent density functional theory is studied. Excitation energies of the helium and beryllium atoms are calculated, both from the exact Kohn-Sham ground-state pote

## Abstract We derive new formulas for harmonic, diffraction, elastic, and hydrodynamic potentials acting on anisotropic Gaussians and approximate wavelets. These formulas can be used to construct accurate cubature formulas for these potentials. (© 2007 WILEY‐VCH Verlag GmbH & Co. KGaA, Weinheim)